Vienna Research Group Leader "Mathematics and..."


Applications are being invited for outstanding early-career scientists (2-8 years post PhD), interested in building up their first independent research group in the field of "Mathematics" at the University of Vienna.

The aim of this announcement is to source exceptional candidates, who, once selected, will then go on to submit an application together with an experienced scientist at the University of Vienna, to the current call for young investigators by the Vienna Science and Technology Fund (WWTF):

In the case of a successful funding decision, the research group will be financed for 6-8 years, with up to 1.6 million EUR being provided by the WWTF, supplemented by an additional contribution from the University itself. After a successful interim evaluation, the University of Vienna will offer the group leader a tenure-track position.



Applicants should have exceptional promise, or a proven record of research achievement, within the field of Mathematics. They should also provide strong evidence of their potential to make a significant contribution to substantial state-of-the-art scientific research questions in this particular research field. Female applicants are explicitly encouraged to apply.


Application procedure:

Interested PostDoc candidates should contact their possible host scientists at the University of Vienna. Therefore, applications, including a CV and a short statement of the intended research project, should be sent to the respective host scientist by no later than 30th April 2017.


For further information please contact:
Barbara Leitner
Research Services and Career Development
University of Vienna

Possible hosting labs at the University of Vienna (non-exhaustive list):


Mathematics and Biosciences
Numerics of Partial Differential Equations
Calculus of Variations and Materials
Mathematics and Finance
CAT(0) Cubical Geometry, with Applications
Applied Harmonic Analysis in Data Science
Expander graphs: constructions, generalisations, and applications
Categorical Kaehler Geometry and applications